Fractional decoding of algebraic geometry codes over extension fields
Abstract
In this paper, we study algebraic geometry codes from curves over Fq through their virtual projections which are algebraic geometric codes over Fq. We use the virtual projections to provide fractional decoding algorithms for the codes over Fq. Fractional decoding seeks to perform error correction using a smaller fraction of Fq-symbols than a typical decoding algorithm. In one instance, the bound on the number of correctable errors differs from the usual lower bound by the degree of a pole divisor of an annihilator function. In another, we view the virtual projections as interleaved codes to, with high probability, correct more errors than anticipated.
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